Low delay modulated filter bank

ABSTRACT

The document relates to modulated sub-sampled digital filter banks, as well as to methods and systems for the design of such filter banks. In particular, the present document proposes a method and apparatus for the improvement of low delay modulated digital filter banks. The method employs modulation of an asymmetric low-pass prototype filter and a new method for optimizing the coefficients of this filter. Further, a specific design for a (64) channel filter bank using a prototype filter length of (640) coefficients and a system delay of (319) samples is given. The method substantially reduces artifacts due to aliasing emerging from independent modifications of subband signals, for example when using a filter bank as a spectral equalizer. The method is preferably implemented in software, running on a standard PC or a digital signal processor (DSP), but can also be hardcoded on a custom chip. The method offers improvements for various types of digital equalizers, adaptive filters, multiband companders and spectral envelope adjusting filterbanks used in high frequency reconstruction (HFR) or parametric stereo systems.

The present document relates to modulated sub-sampled digital filter banks, as well as to methods and systems for the design of such filter banks. In particular, it provides a new design method and apparatus for a near-perfect reconstruction low delay cosine or complex-exponential modulated filter bank, optimized for suppression of aliasing emerging from modifications of the spectral coefficients or subband signals. Furthermore, a specific design for a 64 channel filter bank using a prototype filter length of 640 coefficients and a system delay of 319 samples is given.

The teachings of this document may be applicable to digital equalizers, as outlined e.g. in “An Efficient 20 Band Digital Audio Equalizer” A. J. S. Ferreira, J. M. N. Viera, AES preprint 98^(th) Convention 1995 Feb. 25-28 Paris, N.Y., USA; adaptive filters, as outlined e.g. in Adaptive Filtering in Subbands with Critical Sampling: Analysis, Experiments, and Application to Acoustic Echo Cancellation” A. Gilloire, M. Vetterli, IEEE Transactions on Signal Processing, vol. 40, no. 8, August, 1992; multiband companders; and to audio coding systems utilizing high frequency reconstruction (HFR) methods; or audio coding systems employing so-called parametric stereo techniques. In the two latter examples, a digital filter bank is used for the adaptive adjustment of the spectral envelope of the audio signal. An exemplary HFR system is the Spectral Band Replication (SBR) system outlined e.g. in WO 98/57436, and a parametric stereo system is described e.g. in EP1410687.

Throughout this disclosure including the claims, the expressions “subband signals” or “subband samples” denote the output signal or output signals, or output sample or output samples from the analysis part of a digital filter bank or the output from a forward transform, i.e. the transform operating on the time domain data, of a transform based system. Examples for the output of such forward transforms are the frequency domain coefficients from a windowed digital Fourier transform (DFT) or the output samples from the analysis stage of a modified discrete cosine transform (MDCT).

Throughout this disclosure including the claims, the expression “aliasing” denotes a non-linear distortion resulting from decimation and interpolation, possibly in combination with modification (e.g. attenuation or quantization) of the subband samples in a sub-sampled digital filter bank.

A digital filter bank is a collection of two or more parallel digital filters. The analysis filter bank splits the incoming signal into a number of separate signals named subband signals or spectral coefficients. The filter bank is critically sampled or maximally decimated when the total number of subband samples per unit time is the same as that for the input signal. A so called synthesis filter bank combines the subband signals into an output signal. A popular type of critically sampled filter banks is the cosine modulated filter bank, where the filters are obtained by cosine modulation of a low-pass filter, a so-called prototype filter. The cosine modulated filter bank offers effective implementations and is often used in natural audio coding systems. For further details, reference is made to “Introduction to Perceptual Coding” K. Brandenburg, AES, Collected Papers on Digital Audio Bitrate Reduction, 1996.

A common problem in filter bank design is that any attempt to alter the subband samples or spectral coefficients, e.g. by applying an equalizing gain curve or by quantizing the samples, typically renders aliasing artifacts in the output signal. Therefore, filter bank designs are desirable which reduce such artifacts even when the subband samples are subjected to severe modifications.

A possible approach is the use of oversampled, i.e. not critically sampled, filter banks. An example of an oversampled filter bank is the class of complex exponential modulated filter banks, where an imaginary sine modulated part is added to the real part of a cosine modulated filter bank. Such a complex exponential modulated filter bank is described in EP1374399 which is incorporated herewith by reference.

One of the properties of the complex exponential modulated filter banks is that they are free from the main alias terms present in the cosine modulated filter banks. As a result, such filter banks are typically less prone to artifacts induced by modifications to the subband samples. Nevertheless, other alias terms remain and sophisticated design techniques for the prototype filter of such a complex exponential modulated filter bank should be applied in order to minimize the impairments, such as aliasing, emerging from modifications of the subband signals. Typically, the remaining alias terms are less significant than the main alias terms.

A further property of filter banks is the amount of delay which a signal incurs when passing through such filter banks. In particular for real time applications, such as audio and video streams, the filter or system delay should be low. A possible approach to obtain a filter bank having a low total system delay, i.e. a low delay or latency of a signal passing through an analysis filter bank followed by a synthesis filter bank, is the use of short symmetric prototype filters. Typically, the use of short prototype filters leads to relatively poor frequency band separation characteristics and to large frequency overlap areas between adjacent subbands. By consequence, short prototype filters usually do not allow for a filter bank design that suppresses the aliasing adequately when modifying the subband samples and other approaches to the design of low delay filter banks are required.

It is therefore desirable to provide a design method for filter banks which combine a certain number of desirable properties. Such properties are a high level of insusceptibility to signal impairments, such as aliasing, subject to modifications of the subband signals; a low delay or latency of a signal passing through the analysis and synthesis filter banks; and a good approximation of the perfect reconstruction property. In other words, it is desirable to provide a design method for filter banks which generate a low level of errors. Sub-sampled filter banks typically generate two types of errors, linear distortion from the pass-band term which further can be divided into amplitude and phase errors, and non-linear distortion emerging from the aliasing terms. Even though a “good approximation” of the PR (perfect reconstruction) property would keep all of these errors on a low level, it may be beneficial from a perceptual point of view to put a higher emphasis on the reduction of distortions caused by aliasing.

Furthermore, it is desirable to provide a prototype filter which can be used to design an analysis and/or synthesis filter bank which exhibits such properties. It is a further desirable property of a filter bank to exhibit a near constant group delay in order to minimize artifacts due to phase dispersion of the output signal.

The present document shows that impairments emerging from modifications of the subband signals can be significantly reduced by employing a filter bank design method, referred to as improved alias term minimization (IATM) method, for optimization of symmetric or asymmetric prototype filters.

The present document teaches that the concept of pseudo QMF (Quadrature Mirror Filter) designs, i.e. near perfect reconstruction filter bank designs, may be extended to cover low delay filter bank systems employing asymmetric prototype filters. As a result near perfect reconstruction filter banks with a low system delay, low susceptibility to aliasing and/or low level of pass band errors including phase dispersion can be designed. Depending on the particular needs, the emphasis put on either one of the filter bank properties may be changed. Hence, the filter bank design method according to the present document alleviates the current limitations of PR filter banks used in an equalization system or other system modifying the spectral coefficients.

The design of a low delay complex-exponential modulated filter bank according to the present document may comprise the steps:

-   -   a design of an asymmetric low-pass prototype filter with a         cutoff frequency of π/2M, optimized for desired aliasing and         pass band error rejections, further optimized for a system delay         D; M being the number of channels of the filter bank; and     -   a construction of an M-channel filter bank by         complex-exponential modulation of the optimized prototype         filter.

Furthermore, the operation of such a low delay complex-exponential modulated filter bank according to the present document may comprise the steps:

-   -   a filtering of a real-valued time domain signal through the         analysis part of the filter bank;     -   a modification of the complex-valued subband signals, e.g.         according to a desired, possibly time-varying, equalizer         setting;     -   a filtering of the modified complex-valued subband samples         through the synthesis part of the filter bank; and     -   a computation of the real part of the complex-valued time domain         output signal obtained from the synthesis part of the filter         bank.

In addition to presenting a new filter design method, the present document describes a specific design of a 64 channel filter bank having a prototype filter length of 640 coefficients and a system delay of 319 samples.

The teachings of the present document, notably the proposed filter bank and the filter banks designed according to the proposed design method may be used in various applications. Such applications are the improvement of various types of digital equalizers, adaptive filters, multiband companders and adaptive envelope adjusting filter banks used in HFR or parametric stereo systems.

According to a first aspect, a method for determining N coefficients of an asymmetric prototype filter p₀ for usage for building an M-channel, low delay, subsampled analysis/synthesis filter bank is described. The analysis/synthesis filter bank may comprise M analysis filters h_(k) and M synthesis filters f_(k), wherein k takes on values from 0 to M−1 and wherein typically M is greater than 1. The analysis/synthesis filter bank has an overall transfer function, which is typically associated with the coefficients of the analysis and synthesis filters, as well as with the decimation and/or interpolation operations.

The method comprises the step of choosing a target transfer function of the filter bank comprising a target delay D. Typically a target delay D which is smaller or equal to N is selected. The method comprises further the step of determining a composite objective function e_(tot) comprising a pass band error term e_(t) and an aliasing error term e_(a). The pass band error term is associated with the deviation between the transfer function of the filter bank and the target transfer function, and the aliasing error term e_(a) is associated with errors incurred due to the subsampling, i.e. decimation and/or interpolation of the filter bank. In a further method step, the N coefficients of the asymmetric prototype filter p₀ are determined that reduce the composite objective function e_(tot).

Typically, the step of determining the objective error function e_(tot) and the step of determining the N coefficients of the asymmetric prototype filter p₀ are repeated iteratively, until a minimum of the objective error function e_(tot) is reached. In other words, the objective function e_(tot), is determined on the basis of a given set of coefficients of the prototype filter, and an updated set of coefficients of the prototype filter is generated by reducing the objective error function. This process is repeated until no further reductions of the objective function may be achieved through the modification of the prototype filter coefficients. This means that the step of determining the objective error function e_(tot) may comprise determining a value for the composite objective function e_(tot) for given coefficients of the prototype filter p₀ and the step of determining the N coefficients of the asymmetric prototype filter p₀ may comprise determining updated coefficients of the prototype filter p₀ based on the gradient of the composite objective function e_(tot) associated with the coefficients of the prototype filter p₀.

According to a further aspect, the composite objective error function e_(tot) is given by:

e _(tot)(α)=αe _(t)+(1−α)e _(a),

with e_(t) being the pass band error term, e_(a) being the aliasing error term and a being a weighting constant taking on values between 0 and 1. The pass band error term e_(t) may be determined by accumulating the squared deviation between the transfer function of the filter bank and the target transfer function for a plurality of frequencies. In particular, the pass band error term e_(t) may be calculated as

${e_{t} = {\frac{1}{2\pi}{\int_{- \pi}^{\pi}{{{{\frac{1}{2}\left( {{A_{0}\left( ^{j\; \omega} \right)} + {A_{0}^{*}\left( ^{{- j}\; \omega} \right)}} \right)} - {{P(\omega)}^{{- j}\; \omega \; D}}}}^{2}{\omega}}}}},$

with P(ω)e^(−ωD) being the target transfer function, and

${{A_{0}(z)} = {\sum\limits_{k = 0}^{M - 1}{{H_{k}(z)}{F_{k}(z)}}}},$

wherein H_(k)(z) and F_(k)(z) are the z-transforms of the analysis and synthesis filters h_(k)(n) and f_(k)(n), respectively.

The aliasing error term e_(a) is determined by accumulating the squared magnitude of alias gain terms for a plurality of frequencies. In particular, the aliasing error term e_(a) is calculated as

${e_{a} = {\frac{1}{2\pi}{\sum\limits_{l = 1}^{M - 1}{\int_{- \pi}^{\pi}{{{{\overset{\sim}{A}}_{l}\left( ^{j\; \omega} \right)}}^{2}{\omega}}}}}},$

with

${{{\overset{\sim}{A}}_{l}(z)} = {\frac{1}{2}\left( {{A_{l}(z)} + {A_{M - l}*(z)}} \right)}},$

l=1 . . . M−1, for z=e^(jω) and with

${A_{l}(z)} = {\sum\limits_{k = 0}^{M - 1}{{H_{k}\left( {zW}^{l} \right)}{F_{k}(z)}}}$

being the l^(th) alias gain term evaluated on the unit circle with W=e^(−i2π/M), wherein H_(k)(z) and F_(k)(z) are the z-transforms of the analysis and synthesis filters h_(k)(n) and f_(k)(n), respectively. The notation A_(l*)(z) is the z-transform of the complex-conjugated sequence a_(l) (n).

According to a further aspect, the step of determining a value for the composite objective function e_(tot) may comprise generating the analysis filters h_(k)(n) and the synthesis filters f_(k)(n) of the analysis/synthesis filter bank based on the prototype filter p₀(n) using cosine modulation, sine modulation and/or complex-exponential modulation. In particular, the analysis and synthesis filters may be determined using cosine modulation as

${{h_{k}(n)} = {\sqrt{2}{p_{0}(n)}\; \cos \left\{ {\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - {\frac{D}{2} \mp \frac{M}{2}}} \right)} \right\}}},$

with n=0 . . . N−1, for the M analysis filters of the analysis filter bank and;

${{f_{k}(n)} = {\sqrt{2}{p_{0}(n)}\cos \left\{ {\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - {\frac{D}{2} \pm \frac{M}{2}}} \right)} \right\}}},$

with n=0 . . . N−1, for the M synthesis filters of the synthesis filter bank.

The analysis and synthesis filters may also be determined using complex exponential modulation as

${{h_{k}(n)} = {{p_{0}(n)}\exp \left\{ {\; \frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - \frac{D}{2} - A} \right)} \right\}}},$

with n=0 . . . N−1, and A being an arbitrary constant, for the M analysis filters of the analysis filter bank and;

${{f_{k}(n)} = {{p_{0}(n)}\exp \left\{ {\; \frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - \frac{D}{2} + A} \right)} \right\}}},$

with n=0 . . . N−1, for the M synthesis filters of the synthesis filter bank.

According to another aspect, the step of determining a value for the composite objective function e_(tot) may comprise setting at least one of the filter bank channels to zero. This may be achieved by applying zero gain to at least one analysis and/or synthesis filter, i.e. the filter coefficients h_(k) and/or f_(k) may be set to zero for at least one channel k. In an example a predetermined number of the low frequency channels and/or a predetermined number of the high frequency channels may be set to zero. In other words, the low frequency filter bank channels k=0 up to C_(low); with C_(low), greater than zero may be set to zero. Alternatively or in addition, the high frequency filter bank channels k=C_(high) up to M−1, with C_(high) smaller than M−1 may be set to zero.

In such a case, the step of determining a value for the composite objective function e_(tot) may comprise generating the analysis and synthesis filters for the aliasing terms C_(low) and M−C_(low) and/or C_(high) and M−C_(high) using complex exponential modulation. It may further comprise generating the analysis and synthesis filters for the remaining aliasing terms using cosine modulation. In other words, the optimization procedure may be done in a partially complex-valued manner, where the aliasing error terms which are free from main aliasing are calculated using realvalued filters, e.g. filters generated using cosine modulation, and where the aliasing error terms which carry the main aliasing in a real-valued system are modified for complex-valued processing, e.g. using complex exponential modulated filters.

According to a further aspect, the analysis filter bank may generate M subband signals from an input signal using the M analysis filters h_(k). These M subband signals may be decimated by a factor M, yielding decimated subband signals. Typically, the decimated subband signals are modified, e.g. for equalization purposes or for compression purposes. The possibly modified decimated subband signals may be upsampled by a factor M and the synthesis filter bank may generate an output signal from the upsampled decimated subband signals using the M synthesis filters fk.

According to another aspect, an asymmetric prototype filter p₀(n) comprising coefficients derivable from the coefficients of Table 1 by any of the operations of rounding, truncating, scaling, subsampling or oversampling is described. Any combination of the operations rounding, truncating, scaling, subsampling or oversampling are possible.

The rounding operation of the filter coefficients may comprise any one of the following: rounding to more than 20 significant digits, more than 19 significant digits, more than 18 significant digits, more than 17 significant digits, more than 16 significant digits, more than 15 significant digits, more than 14 significant digits, more than 13 significant digits, more than 12 significant digits, more than 11 significant digits, more than 10 significant digits, more than 9 significant digits, more than 8 significant digits, more than 7 significant digits, more than 6 significant digits, more than 5 significant digits, more than 4 significant digits, more than 3 significant digits, more than 2 significant digits, more than 1 significant digits, 1 significant digit.

The truncating operation of the filter coefficients may comprise any one of the following: truncating to more than 20 significant digits, more than 19 significant digits, more than 18 significant digits, more than 17 significant digits, more than 16 significant digits, more than 15 significant digits, more than 14 significant digits, more than 13 significant digits, more than 12 significant digits, more than 11 significant digits, more than 10 significant digits, more than 9 significant digits, more than 8 significant digits, more than 7 significant digits, more than 6 significant digits, more than 5 significant digits, more than 4 significant digits, more than 3 significant digits, more than 2 significant digits, more than 1 significant digits, 1 significant digit.

The scaling operation of the filter coefficient may comprise up-scaling or down-scaling of the filter coefficients. In particular, it may comprise up- and/or down-scaling scaling by the number M of filter bank channels. Such up- and/or down-scaling may be used to maintain the input energy of an input signal to the filter bank at the output of the filter bank.

The subsampling operation may comprise subsampling by a factor less or equal to 2, less or equal to 3, less or equal to 4, less or equal to 8, less or equal to 16, less or equal to 32, less or equal to 64, less or equal to 128, less or equal to 256. The subsampling operation may further comprise the determination of the subsampled filter coefficients as the mean value of adjacent filter coefficient. In particular, the mean value of R adjacent filter coefficients may be determined as the subsampled filter coefficient, wherein R is the subsampling factor.

The oversampling operation may comprise oversampling by a factor less or equal to 2, less or equal to 3, less or equal to 4, less or equal to 5, less or equal to 6, less or equal to 7, less or equal to 8, less or equal to 9, less or equal to 10. The oversampling operation may further comprise the determination of the oversampled filter coefficients as the interpolation between two adjacent filter coefficients.

According to a further aspect, a filter bank comprising M filters is described. The filters of this filter bank are based on the asymmetric prototype filters described in the present document and/or the asymmetric prototype filters determined via the methods outlined in the present document. In particular, the M filters may be modulated version of the prototype filter and the modulation may be a cosine modulation, sine modulation and/or complex-exponential modulation.

According to another aspect, a method for generating decimated subband signals with low sensitivity to aliasing emerging from modifications of said subband signals is described. The method comprises the steps of determining analysis filters of an analysis/synthesis filter bank according to methods outlined in the present document; filtering a real-valued time domain signal through said analysis filters, to obtain complex-valued subband signals; and decimating said subband signals. Furthermore, a method for generating a real valued output signal from a plurality of complex-valued subband signals with low sensitivity to aliasing emerging from modifications of said subband signals is described. The method comprises the steps of determining synthesis filters of an analysis/synthesis filter bank according to the methods outlined in the present document; interpolating said plurality of complex-valued subband signals; filtering said plurality of interpolated subband signals through said synthesis filters; generating a complex-valued time domain output signal as the sum of the signals obtained from said filtering; and taking the real part of the complex-valued time domain output signal as the real-valued output signal.

According to another aspect, a system operative of generating subband signals from a time domain input signal are described, wherein the system comprises an analysis filter bank which has been generated according to methods outlined in the present document and/or which is based on the prototype filters outlined in the present document.

It should be noted that the aspects of the methods and systems including its preferred embodiments as outlined in the present patent application may be used stand-alone or in combination with the other aspects of the methods and systems disclosed in this document. Furthermore, all aspects of the methods and systems outlined in the present patent application may be arbitrarily combined. In particular, the features of the claims may be combined with one another in an arbitrary manner.

The present invention will now be described by way of illustrative examples, not limiting the scope, with reference to the accompanying drawings, in which:

FIG. 1 illustrates the analysis and synthesis sections of a digital filter bank;

FIG. 2 shows the stylized frequency responses for a set of filters to illustrate the adverse effect when modifying the subband samples in a cosine modulated, i.e. real-valued, filter bank;

FIG. 3 shows a flow diagram of an example of the optimization procedure;

FIG. 4 shows a time domain plot and the frequency response of an optimized prototype filter for a low delay modulated filter bank having 64 channels and a total system delay of 319 samples; and

FIG. 5 illustrates an example of the analysis and synthesis parts of a low delay complex-exponential modulated filter bank system.

It should be understood that the present teachings are applicable to a range of implementations that incorporate digital filter banks other than those explicitly mentioned in this patent. In particular, the present teachings may be applicable to other methods for designing a filter bank on the basis of a prototype filter.

In the following, the overall transfer function of an analysis/synthesis filter bank is determined. In other words, the mathematical representation of a signal passing through such a filter bank system is described. A digital filter bank is a collection of M, M being two or more, parallel digital filters that share a common input or a common output. For details on such filter banks, reference is made to

“Multirate Systems and Filter Banks” P.P. Vaidyanathan Prentice Hall: Englewood Cliffs, N.J., 1993. When sharing a common input the filter bank may be called an analysis bank. The analysis bank splits the incoming signal into M separate signals called subband signals. The analysis filters are denoted H_(k)(z), where k=0, . . . , M−1. The filter bank is critically sampled or maximally decimated when the subband signals are decimated by a factor M. Thus, the total number of subband samples per time unit across all subbands is the same as the number of samples per time unit for the input signal. The synthesis bank combines these subband signals into a common output signal. The synthesis filters are denoted F_(k)(z), for k=0, . . . , M−1.

A maximally decimated filter bank with M channels or subbands is shown in FIG. 1. The analysis part 101 produces from the input signal X(z) the subband signals V_(k) (z), which constitute the signals to be transmitted, stored or modified. The synthesis part 102 recombines the signals V_(k)(z) to the output signal {circumflex over (X)}(z).

The recombination of V_(k) (z) to obtain the approximation {circumflex over (X)}(z) of the original signal X(z) is subject to several potential errors. The errors may be due to an approximation of the perfect reconstruction property, and includes non-linear impairments due to aliasing, which may be caused by the decimation and interpolation of the subbands. Other errors resulting from approximations of the perfect reconstruction property may be due to linear impairments such as phase and amplitude distortion.

Following the notations of FIG. 1, the outputs of the analysis filters H_(k)(z) 103 are

X _(k)(z)=H _(k)(z)X(z),  (1)

where k=0, . . . , M−1. The decimators 104, also referred to as down-sampling units, give the outputs

$\begin{matrix} {{{V_{k}(z)} = {{\frac{1}{M}{\sum\limits_{l = 0}^{M - 1}{X_{k}\left( {z^{1/M}W^{l}} \right)}}} = {\frac{1}{M}{\sum\limits_{l = 0}^{M - 1}{{H_{k}\left( {z^{1/M}W^{l}} \right)}{X\left( {z^{1/M}W^{l}} \right)}}}}}},} & (2) \end{matrix}$

where W=e^(−i2π/M). The outputs of the interpolators 105, also referred to as up-sampling units, are given by

$\begin{matrix} {{{U_{k}(z)} = {{V_{k}\left( z^{M} \right)} = {\frac{1}{M}{\sum\limits_{l = 0}^{M - 1}{{H_{k}\left( {zW}^{l} \right)}{X\left( {zW}^{l} \right)}}}}}},} & (3) \end{matrix}$

and the sum of the signals obtained from the synthesis filters 106 can be written as

$\begin{matrix} \begin{matrix} {{\hat{X}(z)} = {\sum\limits_{k = 0}^{M - 1}{{F_{k}(z)}{U_{k}(z)}}}} \\ {= {{\sum\limits_{k = 0}^{M - 1}{F_{k}\; (z)\frac{1}{M}{\sum\limits_{l = 0}^{M - 1}{{H_{k}\left( {zW}^{l} \right)}{X\left( {zW}^{l} \right)}}}}} =}} \\ {= {\frac{1}{M}{\sum\limits_{l = 0}^{M - 1}{{X\left( {zW}^{l} \right)}{\sum\limits_{k = 0}^{M - 1}{{H_{k}\left( {zW}^{l} \right)}{F_{k}(z)}}}}}}} \\ {= {\frac{1}{M}{\sum\limits_{l = 0}^{M - 1}{{X\left( {zW}^{l} \right)}{A_{l}(z)}}}}} \end{matrix} & (4) \\ {where} & \; \\ {{A_{l}(z)} = {\sum\limits_{k = 0}^{M - 1}{{H_{k}\left( {zW}^{l} \right)}{F_{k}(z)}}}} & (5) \end{matrix}$

is the gain for the l^(th) alias term X(zW^(l)). Eq. (4) shows that {circumflex over (X)}(z) is a sum of M components consisting of the product of the modulated input signal X(zW^(l)) and the corresponding alias gain term A_(l)(z). Eq. (4) can be rewritten as

$\begin{matrix} {{\hat{X}(z)} = {\frac{1}{M}{\left\{ {{{X(z)}{A_{0}(z)}} + {\sum\limits_{l = 1}^{M - 1}{{X\left( {zW}^{l} \right)}{A_{l}(z)}}}} \right\}.}}} & (6) \end{matrix}$

The last sum on the right hand side (RHS) constitutes the sum of all non-wanted alias terms. Canceling all aliasing, that is forcing this sum to zero by means of proper choices of H_(k)(z) and F_(k)(z), gives

$\begin{matrix} {{{\hat{X}(z)} = {{\frac{1}{M}{X(z)}{A_{0}(z)}} = {{\frac{1}{M}{X(z)}{\sum\limits_{k = 0}^{M - 1}{{H_{k}(z)}{F_{k}(z)}}}} = {{X(z)}{T(z)}}}}},{where}} & (7) \\ {{T(z)} = {\frac{1}{M}{\sum\limits_{k = 0}^{M - 1}{{H_{k}(z)}{F_{k}(z)}}}}} & (8) \end{matrix}$

is the overall transfer function or distortion function. Eq. (8) shows that, depending on H_(k)(z) and F_(k)(z), T(z) could be free from both phase distortion and amplitude distortion. The overall transfer function would in this case simply be a delay of D samples with a constant scale factor c, i.e.

T(z)=cz ^(−D),  (9)

which substituted into Eq. (7) gives

{circumflex over (X)}(z)=cz ^(−D) X(z)  (10)

The type of filters that satisfy Eq. (10) are said to have the perfect reconstruction (PR) property. If Eq. (10) is not perfectly satisfied, albeit satisfied approximately, the filters are of the class of approximate perfect reconstruction filters.

In the following, a method for designing analysis and synthesis filter banks from a prototype filter is described. The resulting filter banks are referred to as cosine modulated filter banks. In the traditional theory for cosine modulated filter banks, the analysis filters h_(k)(n) and synthesis filters f_(k)(n) are cosine modulated versions of a symmetric low-pass prototype filter p₀(n), i.e.

$\begin{matrix} {{{h_{k}(n)} = {\sqrt{2}{p_{0}(n)}\cos \left\{ {\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - {\frac{N}{2} \mp \frac{M}{2}}} \right)} \right\}}},{0 \leq n \leq N},{0 \leq k < M}} & (11) \\ {{{f_{k}(n)} = {\sqrt{2}{p_{0}(n)}\cos \left\{ {\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - {\frac{N}{2} \pm \frac{M}{2}}} \right)} \right\}}},{0 \leq n \leq N},{0 \leq k < M}} & (12) \end{matrix}$

respectively, where M is the number of channels of the filter bank and N is the prototype filter order.

The above cosine modulated analysis filter bank produces real-valued subband samples for real-valued input signals. The subband samples are down sampled by a factor M, making the system critically sampled. Depending on the choice of the prototype filter, the filter bank may constitute an approximate perfect reconstruction system, i.e. a so called pseudo QMF bank described e.g. in U.S. Pat. No. 5,436,940, or a perfect reconstruction (PR) system. An example of a PR system is the modulated lapped transform (MLT) described in further detail in “Lapped Transforms for Efficient Transform/Subband Coding” H. S. Malvar, IEEE Trans ASSP, vol. 38, no. 6, 1990. The overall delay, or system delay, for a traditional cosine modulated filter bank is N.

In order to obtain filter bank systems having lower system delays, the present document teaches to replace the symmetric prototype filters used in conventional filter banks by asymmetric prototype filters. In the prior art, the design of asymmetric prototype filters has been restricted to systems having the perfect reconstruction (PR) property. Such a perfect reconstruction system using asymmetric prototype filters is described in EP0874458. However, the perfect reconstruction constraint imposes limitations to a filter bank used in e.g. an equalization system, due to the restricted degrees of freedom when designing the prototype filter. It should by noted that symmetric prototype filters have a linear phase, i.e. they have a constant group delay across all frequencies. On the other hand, asymmetric filters typically have a non-linear phase, i.e. they have a group delay which may change with frequency.

In filter bank systems using asymmetric prototype filters, the analysis and synthesis filters may be written as

$\begin{matrix} {{{h_{k}(n)} = {\sqrt{2}{{\hat{h}}_{0}(n)}\cos \left\{ {\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - {\frac{D}{2} \mp \frac{M}{2}}} \right)} \right\}}},{0 \leq n < N_{h}},{0 \leq k < M}} & (13) \\ {{{f_{k}(n)} = {\sqrt{2}{{\hat{f}}_{0}(n)}\cos \left\{ {\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - {\frac{D}{2} \pm \frac{M}{2}}} \right)} \right\}}},{0 \leq n < N_{f}},{0 \leq k < M}} & (14) \end{matrix}$

respectively, where ĥ₀ (n) and {circumflex over (f)}₀ (n) are the analysis and synthesis prototype filters of lengths N_(h) and N_(f), respectively, and D is the total delay of the filter bank system. Without limiting the scope, the modulated filter banks studied in the following are systems where the analysis and synthesis prototypes are identical, i.e.

{circumflex over (f)} ₀(n)=ĥ ₀(n)=p ₀(n),0≦n<N _(h) =N _(f) =N  (15)

where N is the length of the prototype filter p₀(n).

It should be noted, however, when using the filter design schemes outlined in the present document, that filter banks using different analysis and synthesis prototype filters may be determined.

One inherent property of the cosine modulation is that every filter has two pass bands; one in the positive frequency range and one corresponding pass band in the negative frequency range. It can be verified that the so-called main, or significant, alias terms emerge from overlap in frequency between either the filters negative pass bands with frequency modulated versions of the positive pass bands, or reciprocally, the filters positive pass bands with frequency modulated versions of the negative pass bands. The last terms in Eq. (13) and (14), i.e. the terms

${\frac{\pi}{2}\left( {k + \frac{1}{2}} \right)},$

are selected so as to provide cancellation of the main alias terms in cosine modulated filter banks. Nevertheless, when modifying the subband samples, the cancellation of the main alias terms is impaired, thereby resulting in a strong impact of aliasing from the main alias terms. It is therefore desirable to remove these main alias terms from the subband samples altogether.

The removal of the main alias terms may be achieved by the use of so-called Complex-Exponential Modulated Filter Banks which are based on an extension of the cosine modulation to complex-exponential modulation. Such extension yields the analysis filters h_(k)(n) as

$\begin{matrix} {{{h_{k}(n)} = {{p_{0}(n)}\exp \left\{ {i\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - {\frac{D}{2} \mp \frac{M}{2}}} \right)} \right\}}},{0 \leq n < N},{0 \leq k < M}} & (16) \end{matrix}$

using the same notation as before. This can be viewed as adding an imaginary part to the real-valued filter bank, where the imaginary part consists of sine modulated versions of the same prototype filter. Considering a real-valued input signal, the output from the filter bank can be interpreted as a set of subband signals, where the real and the imaginary parts are Hilbert transforms of each other. The resulting subbands are thus the analytic signals of the real-valued output obtained from the cosine modulated filter bank. Hence, due to the complex-valued representation, the subband signals are over-sampled by a factor two.

The synthesis filters are extended in the same way to

$\begin{matrix} {{{f_{k}(n)} = {{p_{0}(n)}\exp \left\{ {i\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - {\frac{D}{2} \pm \frac{M}{2}}} \right)} \right\}}},{0 \leq n < N},{0 \leq k < {M.}}} & (17) \end{matrix}$

Eq. (16) and (17) imply that the output from the synthesis bank is complex-valued. Using matrix notation, where C_(a) is a matrix with the cosine modulated analysis filters from Eq. (13), and S_(a) is a matrix with the sine modulation of the same argument, the filters of Eq. (16) are obtained as C_(a)+j S_(a). In these matrices, k is the row index and n is the column index. Analogously, the matrix C_(s) has synthesis filters from Eq. (14), and S_(s) is the corresponding sine modulated version. Eq. (17) can thus be written C_(s)+j S_(S) where k is the column index and n is the row index. Denoting the input signal x, the output signal y is found from

y=(C _(s) +jS _(s))(C _(a) +jS _(a))x=(C _(s) C _(a) −S _(s) S _(a))x+j(C _(s) S _(a) +S _(s) C _(a))x  (18)

As seen from Eq. (18), the real part comprises two terms; the output from the cosine modulated filter bank and an output from a sine modulated filter bank. It is easily verified that if a cosine modulated filter bank has the PR property, then its sine modulated version, with a change of sign, constitutes a PR system as well. Thus, by taking the real part of the output, the complex-exponential modulated system offers the same reconstruction accuracy as the corresponding cosine modulated version. In other words, when using a real-valued input signal, the output signal of the complex-exponential modulated system may be determined by taking the real part of the output signal.

The complex-exponential modulated system may be extended to handle also complex-valued input signals. By extending the number of channels to 2M, i.e. by adding the filters for negative frequencies, and by keeping the imaginary part of the output signal, a pseudo QMF or a PR system for complex-valued signals is obtained.

It should be noted that the complex-exponential modulated filter bank has one pass band only for every filter in the positive frequency range. Hence, it is free from the main alias terms. The absence of main alias terms makes the aliasing cancellation constraint from the cosine (or sine) modulated filter bank obsolete in the complex-exponential modulated version. The analysis and synthesis filters can thus be given as

$\begin{matrix} {{{{h_{k}(n)} = {{p_{0}(n)}\exp \left\{ {i\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - \frac{D}{2} - A} \right)} \right\}}},{0 \leq n < N},{0 \leq k < M}}{and}} & (19) \\ {{{f_{k}(n)} = {{p_{0}(n)}\exp \left\{ {i\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - \frac{D}{2} + A} \right)} \right\}}},{0 \leq n < N},{0 \leq k < M}} & (20) \end{matrix}$

where A is an arbitrary (possibly zero) constant, and as before, M is the number of channels, N is the prototype filter length, and D is the system delay. By using different values of A, more efficient implementations of the analysis and synthesis filter banks, i.e. implementations with reduced complexity, can be obtained.

Before presenting a method for optimization of prototype filters, the disclosed approaches to the design of filter banks are summarized. Based on symmetric or asymmetric prototype filters, filter banks may be generated e.g. by modulating the prototype filters using a cosine function or a complex-exponential function. The prototype filters for the analysis and synthesis filter banks may either be different or identical. When using complex-exponential modulation, the main alias terms of the filter banks are obsolete and may be removed, thereby reducing the aliasing sensitivity to modifications of the subband signals of the resulting filter banks. Furthermore, when using asymmetric prototype filters the overall system delay of the filter banks may be reduced. It has also been shown that when using complex-exponential modulated filter banks, the output signal from a real valued input signal may be determined by taking the real part of the complex output signal of the filter bank.

In the following a method for optimization of the prototype filters is described in detail. Depending on the needs, the optimization may be directed at increasing the degree of perfect reconstruction i.e. at reducing the combination of aliasing and amplitude distortion, at reducing the sensitivity to aliasing, at reducing the system delay, at reducing phase distortion, and/or at reducing amplitude distortion. In order to optimize the prototype filter p₀(n) first expressions for the alias gain terms are determined. In the following, the alias gain terms for a complex exponential modulated filter bank are derived. However, it should be noted that the alias gain terms outlined are also valid for a cosine modulated (real valued) filter bank.

Referring to Eq. (4), the z-transform of the real part of the output signal {circumflex over (x)}(n) is

$\begin{matrix} {{Z\left\{ {{Re}\left( {\hat{x}(n)} \right)} \right\}} = {{{\hat{X}}_{R}(z)} = {\frac{{\hat{X}(z)} + {\hat{X}*(z)}}{2}.}}} & (21) \end{matrix}$

The notation {circumflex over (X)}*(z) is the z-transform of the complex-conjugated sequence {circumflex over (x)}(n). From Eq. (4), it follows that the transform of the real part of the output signal is

$\begin{matrix} {{{{\hat{X}}_{R}(z)} = {\frac{1}{M}{\sum\limits_{l = 0}^{M - 1}\; {\frac{1}{2}\left( {{{X\left( {zW}^{l} \right)}{A_{l}(z)}} + {{X\left( {zW}^{- l} \right)}A_{l}*(z)}} \right)}}}},} & (22) \end{matrix}$

where it was used that the input signal x(n) is real-valued, i.e. X*(zW^(l))=X(zW^(−l)). Eq. (22) may after rearrangement be written

$\begin{matrix} {\begin{matrix} {{{\hat{X}}_{R}(z)} = {{\frac{1}{M}\begin{pmatrix} {{{X(z)}\frac{1}{2}\left( {{A_{0}(z)} + {A_{0}*(z)}} \right)} +} \\ {\sum\limits_{l = 1}^{M - 1}\; {\frac{1}{2}\left( {{{X\left( {zW}^{l} \right)}{A_{l}(z)}} + {{X\left( {zW}^{M - l} \right)}A_{l}*(z)}} \right)}} \end{pmatrix}} =}} \\ {= {{\frac{1}{M}\begin{pmatrix} {{{X(z)}\frac{1}{2}\left( {{A_{0}(z)} + {A_{0}*(z)}} \right)} +} \\ {\sum\limits_{l = 1}^{M - 1}\; {{X\left( {zW}^{l} \right)}\frac{1}{2}\left( {{A_{l}(z)} + {A_{M - l}*(z)}} \right)}} \end{pmatrix}} =}} \\ {= {\frac{1}{M}\left( {{{X(z)}{{\overset{\sim}{A}}_{0}(z)}} + {\sum\limits_{l = 1}^{M - 1}\; {{X\left( {zW}^{l} \right)}{{\overset{\sim}{A}}_{l}(z)}}}} \right)}} \end{matrix}{where}} & (23) \\ {{{{\overset{\sim}{A}}_{l}(z)} = {\frac{1}{2}\left( {{A_{l}(z)} + {A_{M - l}*(z)}} \right)}},{0 \leq l < M}} & (24) \end{matrix}$

are the alias gain terms used in the optimization. It can be observed from Eq. (24) that

$\begin{matrix} {{{\overset{\sim}{A}}_{M - l}(z)} = {{\frac{1}{2}\left( {{A_{M - l}(z)} + {A_{l}*(z)}} \right)} = {{\overset{\sim}{A}}_{l}*{(z).}}}} & (25) \end{matrix}$

Specifically, for real-valued systems

A _(M-l)*(z)=A _(l)(z)  (26)

which simplifies Eq. (24) into

Ã _(l)(z)=A _(l)(z),0≦l<M.  (27)

By inspecting Eq. (23), and recalling the transform of Eq. (21), it can be seen that the real part of a₀(n) must be a Dirac pulse for a PR system, i.e. Ã₀(z) is on the form Ã₀(z)=cz^(−D). Moreover, the real part of a_(M/2)(n) must be zero, i.e. Ã_(M/2)(z) must be zero, and the alias gains, for l≠0, M/2 must satisfy

A _(M-l)*(z)=−A _(l)*(z),  (28)

which for a real-valued system, with Eq. (26) in mind, means that all a_(l)(n), l=1 . . . M−1 must be zero. In pseudo QMF systems, Eq. (28) holds true only approximately. Moreover, the real part of a₀(n) is not exactly a Dirac-pulse, nor is the real part of a_(M/2)(n) exactly zero.

Before going into further details on the optimization of the prototype filters, the impact of modifications of the subband samples on aliasing is investigated. As already mentioned above, changing the gains of the channels in a cosine modulated filter bank, i.e. using the analysis/synthesis system as an equalizer, renders severe distortion due to the main alias terms. In theory, the main alias terms cancel each other out in a pair wise fashion. However, this theory of main alias term cancellation breaks, when different gains are applied to different subband channels. Hence, the aliasing in the output signal may be substantial. To show this, consider a filter bank where channel p and higher channels are set to zero gain, i.e.

$\begin{matrix} {{{v_{k}^{\prime}(n)} = {g_{k}{v_{k}(n)}}},\left\{ \begin{matrix} {{g_{k} = 1},} & {0 \leq k < p} \\ {{g_{k} = 0},} & {p \leq k < {M - 1}} \end{matrix} \right.} & (29) \end{matrix}$

The stylized frequency responses of the analysis and synthesis filters of interest are shown in FIG. 2. FIG. 2( a) shows the synthesis channel filters F_(p-1)(z) and F_(p)(z), highlighted by reference signs 201 and 202, respectively. As already indicated above, the cosine modulation for each channel results in one positive frequency filter and one negative frequency filter. In other words, the positive frequency filters 201 and 202 have corresponding negative frequency filters 203 and 204, respectively.

The p^(th) modulation of the analysis filter H_(p-1)(z), i.e. H_(p-1)(zW^(p)) indicated by reference signs 211 and 213, is depicted in FIG. 2( b) together with the synthesis filter F_(p-1)(z), indicated by reference signs 201 and 203. In this Figure, reference sign 211 indicates the modulated version of the originally positive frequency filter H_(p-1)(z) and reference sign 213 indicates the modulated version of the originally negative frequency filter H_(p-1)(z). Due to the modulation of order p, the negative frequency filter 213 is moved to the positive frequency area and therefore overlaps with the positive synthesis filter 201. The shaded overlap 220 of the filters illustrates the energy of a main alias term.

In FIG. 2( c) the p^(th) modulation of H_(p)(z), i.e. H_(p)(zW^(p)) indicated by reference signs 212 and 214, is shown together with the corresponding synthesis filter F_(p)(z), reference signs 202 and 204. Again the negative frequency filter 214 is moved into the positive frequency area due to the modulation of order p. The shaded area 221 again pictorially shows the energy of a main alias term and would un-cancelled typically result in significant aliasing. To cancel the aliasing, the term should be the polarity reversed copy of the aliasing obtained from the intersection of filters H_(p-1)(zW^(p)), 213, and F_(p-1)(z), 201, of FIG. 2( b), i.e. the polarity reversed copy of the shaded area 220. In a cosine modulated filter bank, where the gains are unchanged, these main alias terms will usually cancel each other completely. However, in this example, the gain of the analysis (or synthesis) filter p is zero, so the aliasing induced by filters p−1 will remain un-cancelled in the output signal. An equally strong aliasing residue will also emerge in the negative frequency range.

When using complex-exponential modulated filter banks, the complex-valued modulation results in positive frequency filters only. Consequently, the main alias terms are gone, i.e. there is no significant overlap between the modulated analysis filters H_(p)(zW^(p)) and their corresponding synthesis filters F_(p)(z) and aliasing can be reduced significantly when using such filter bank systems as equalizers. The resulting aliasing is dependent only on the degree of suppression of the remaining alias terms.

Hence, even when using complex-exponential modulated filter banks, it is crucial to design a prototype filter for maximum suppression of the alias gains terms, although the main alias terms have been removed for such filter banks. Even though the remaining alias terms are less significant than the main alias terms, they may still generate aliasing which causes artifacts to the processed signal. Therefore, the design of such a prototype filter can preferably be accomplished by minimizing a composite objective function. For this purpose, various optimization algorithms may be used. Examples are e.g. linear programming methods, Downhill Simplex Method or a non-constrained gradient based method or other nonlinear optimization algorithms. In an exemplary embodiment an initial solution of the prototype filter is selected. Using the composite objective function, a direction for modifying the prototype filter coefficients is determined which provides the highest gradient of the composite objective function. Then the filter coefficients are modified using a certain step length and the iterative procedure is repeated until a minimum of the composite objective function is obtained. For further details on such optimization algorithms, reference is made to “Numerical Recipes in C, The Art of Scientific Computing, Second Edition” W. H. Press, S. A. Teukolsky, W. T. Vetterling, B. P. Flannery, Cambridge University Press, NY, 1992, which is incorporated by reference.

For improved alias term minimization (IATM) of the prototype filter, a preferred objective function may be denoted

e _(tot)(α)=αe _(t)+(1−α)e _(a),  (30)

where the total error e_(tot)(α) is a weighted sum of the transfer function error e_(t) and the aliasing error e_(a). The first term on the right hand side (RHS) of Eq. (23) evaluated on the unit circle, i.e. for z=e^(jω), can be used to provide a measure of the error energy e_(t) of the transfer function as

$\begin{matrix} {{e_{t} = {\frac{1}{2\pi}{\int_{- \pi}^{\pi}{{{{\frac{1}{2}\left( {{A_{0}\left( ^{j\; \omega} \right)} + {A_{0}^{*}\left( ^{{- j}\; \omega} \right)}} \right)} - {{P(\omega)}^{{- j}\; \omega \; S}}}}^{2}\ {\omega}}}}},} & (31) \end{matrix}$

where P(ω) is a symmetric real-valued function defining the pass band and stop band ranges, and D is the total system delay. In other words, P(ω) describes the desired transfer function. In the most general case, such transfer function comprises a magnitude which is a function of the frequency ω. For a real-valued system Eq. (31) simplifies to

$\begin{matrix} {e_{t} = {\frac{1}{2\pi}{\int_{- \pi}^{\pi}{{{{A_{0}\left( ^{j\; \omega} \right)} - {{P(\omega)}^{{- j}\; \omega \; D}}}}^{2}\ {\omega}}}}} & (32) \end{matrix}$

The target function P(ω) and the target delay D may be selected as an input parameter to the optimization procedure. The expression P(ω)e^(−jwD) may be referred to as the target transfer function.

A measure of the energy of the total aliasing e_(a) may be calculated by evaluating the sum of the alias terms on the right hand side (RHS) of Eq. (23), i.e. the second term of Eq. (23), on the unit circle as

$\begin{matrix} {{e_{a} = {\frac{1}{2\pi}{\sum\limits_{l = 1}^{M - 1}\; {\int_{- \pi}^{\pi}{{{{\overset{\sim}{A}}_{l}\left( ^{j\; \omega} \right)}}^{2}\ {\omega}}}}}},} & (33) \end{matrix}$

For real-valued systems this translates to

$\begin{matrix} {e_{a} = {\frac{1}{2\pi}{\sum\limits_{l = 1}^{M - 1}\; {\int_{- \pi}^{\pi}{{{A_{l}\left( ^{j\; \omega} \right)}}^{2}\ {{\omega}.}}}}}} & (34) \end{matrix}$

Overall, an optimization procedure for determining a prototype filter p₀(n) may be based on the minimization of the error of Eq. (30). The parameter α may be used to distribute the emphasis between the transfer function and the sensitivity to aliasing of the prototype filter. While increasing the parameter α towards 1 will put more emphasis on the transfer function error e_(t), reducing the parameter α towards 0 will put more emphasis on the aliasing error e_(a). The parameters P(ω) and D may be used to set a target transfer function of the prototype filter p₀ (n), i.e. to define the pass band and stop band behavior and to define the overall system delay.

According to an example, a number of the filter bank channels k may be set to zero, e.g. the upper half of the filter bank channels are given zero gain. Consequently, the filter bank is triggered to generate a great amount of aliasing. This aliasing will be subsequently minimized by the optimization process. In other words, by setting a certain number of filter bank channels to zero, aliasing will be induced, in order to generate an aliasing error e_(a) which may be minimized during the optimization procedure. Furthermore, computational complexity of the optimization process may be reduced by setting filter bank channels to zero.

According to an example, a prototype filter is optimized for a real valued, i.e. a cosine modulated, filter bank which may be more appropriate than directly optimizing the complex-valued version. This is because real-valued processing prioritizes far-off aliasing attenuation to a larger extent than complex-valued processing. However, when triggering aliasing as outlined above, the major part of the induced aliasing in this case will typically origin from the terms carrying the main alias terms.

Hence, the optimization algorithm may spend resources on minimizing the main aliasing that is inherently non-present in the resulting complex-exponential modulated system. In order to alleviate this, the optimization may be done on a partially complex system; for the alias terms which are free from main aliasing, the optimization may be done using real-valued filter processing. On the other hand, the alias terms that would carry the main alias terms in a real-valued system would be modified for complex-valued filter processing. By means of such partially complex optimization, the benefits of performing the processing using real-valued processing may be obtained, while still optimizing the prototype filter for usage in a complex modulated filter bank system.

In an exemplary optimization where exactly the upper half of the filter bank channels are set to zero, the only alias term calculated from complex valued filters is the term l=M/2 of Eq. (33). In this example, the function P(ω) of Eq. (31), may be chosen as a unit magnitude constant ranging from −π/2+ε to π/2−ε, where ε is a fraction of π/2, in order to cover the frequency range constituting the pass band. Outside the pass band the function P(ω) may be defined to be zero or be left undefined. In the latter case, the error energy of the transfer function Eq. (31) is only evaluated between −π/2+ε and π/2−ε. Alternatively and preferably, the pass band error e_(t) could be calculated over all channels k=0, . . . , M−1, from −π to π with P(ω) being constant, while the aliasing is still calculated with a plurality of the channels set to zero as described above.

Typically the optimization procedure is an iterative procedure, where given the prototype filter coefficients p₀(n) (n=0, . . . , N−1) at a certain iteration step, the target delay D, the number of channels A the numbers of low band channels set to zero loCut, the number of high band channels set to zero hiCut, and the weighting factor α, a value for the objective function for this iteration step is calculated. Using semi-complex operations, this comprises the steps:

-   -   1. To obtain the pass band error e_(t), evaluate Eq. (32) with         P(ω) being a constant, using

$\begin{matrix} {{{A_{0}\left( ^{j\; \omega} \right)} = {\sum\limits_{k = 0}^{M - 1}\; {{H_{k}\left( ^{j\; \omega} \right)}{F_{k}\left( ^{j\; \omega} \right)}}}},} & (35) \end{matrix}$

-   -    where H_(k)(e) and F_(k)(e) are the DFT transforms of the         analysis and synthesis filters h_(k)(n) and f_(k)(n) as         generated from the prototype filters coefficients at this         iteration step from Eq. (13) to (15), respectively.     -   2. To obtain the aliasing error e_(a), for aliasing terms not         subject to significant aliasing, evaluate

$\begin{matrix} {{e_{aReal} = {\frac{1}{2\pi}{\underset{\begin{matrix} {{l \neq {loCut}},{hiCut},} \\ {{M - {loCut}},} \\ {M - {hiCut}} \end{matrix}}{\sum\limits_{l = 1}^{M - 1}}\; {\int_{- \pi}^{\pi}{{{A_{l}\left( ^{j\; \omega} \right)}}^{2}{\omega}}}}}},} & (36) \end{matrix}$

-   -    where A_(l)(e^(jω)) is calculated as

$\begin{matrix} {{A_{l}\left( ^{j\; \omega} \right)} = {\sum\limits_{k = {loCut}}^{M - 1 - {hiCut}}\; {{H_{k}\left( ^{j{({\omega - {\frac{2\pi}{M}l}})}} \right)}{F_{k}\left( ^{j\; \omega} \right)}}}} & (37) \end{matrix}$

-   -    and H_(k)(e^(jω)) and F_(k)(e^(jω)) are the DFT transforms,         i.e. the z-transforms evaluated on the unit circle, of the         analysis and synthesis filters h_(k)(n) and f_(k)(n) from         Eq. (13) to (15).     -   3. For the terms subject to significant aliasing, evaluate

$\begin{matrix} {e_{aCplx} = {\frac{1}{2\pi}{\underset{\begin{matrix} {{hiCut},} \\ {{M - {loCut}},} \\ {M - {hiCut}} \end{matrix}}{\sum\limits_{{l = {loCut}},}^{\;}}\; {\int_{- \pi}^{\pi}{{{{\overset{\sim}{A}}_{l}\left( ^{j\; \omega} \right)}}^{2}{\omega}}}}}} & (38) \end{matrix}$

-   -    where Ã(e^(jω)) is given by Eq. (24), with A_(l)(e^(jω)) as Eq.         (37), with H_(k)(e^(jω)) and F_(k)(e^(jω)) being the DFT         transforms of h_(k)(n) and f_(k)(n) from Eq. (19) and (20).     -   4. The error is subsequently weighted with α as

e _(tot)(α)=αe _(t)+(1−α)(e _(aReal) +e _(aCplx)).  (39)

Using any of the nonlinear optimization algorithms referred to above, this total error is reduced by modifying the coefficients of the prototype filter, until an optimal set of coefficients is obtained. By way of example, the direction of the greatest gradient of the error function e_(tot) is determined for the prototype filter coefficients at a given iteration step. Using a certain step size the prototype filter coefficients are modified in the direction of the greatest gradient. The modified prototype filter coefficients are used as a starting point for the subsequent iteration step. This procedure is repeated until the optimization procedure has converged to a minimum value of the error function e_(tot).

An exemplary embodiment of the optimization procedure is illustrated in FIG. 3 as a flow diagram 300. In a parameter determination step 301 the parameters of the optimization procedure, i.e. notably the target transfer function comprising the target delay D, the number of channels M of the target filter bank, the number N of coefficients of the prototype filter, the weighting parameter α of the objective error function, as well as the parameters for aliasing generation, i.e. loCut and/or hiCut, are defined. In an initialization step 302, a first set of coefficients of the prototype filter is selected.

In the pass band error determination unit 303, the pass band error term e_(t) is determined using the given set of coefficients of the prototype filter. This may be done by using Eq. (32) in combination with Eqs. (35) and (13) to (15). In the real valued aliasing error determination unit 304, a first part e_(aReal) of the aliasing error term e_(a) may be determined using Eqs. (36) and (37) in combination with Eqs. (13) to (15). Furthermore, in the complex valued aliasing error determination unit 305, a second part e_(aCplx) of the aliasing error term e_(a) may be determined using Eq. (38) in combination with Eqs. (19) and (20). As a consequence, the objective function e_(tot) may be determined from the results of the units 303, 304 and 305 using Eq. (39).

The nonlinear optimization unit 306 uses optimization methods, such as linear programming, in order to reduce the value of the objective function. By way of example, this may be done by determining a possibly maximum gradient of the objective function with regards to modifications of the coefficients of the prototype filter. In other words, those modifications of the coefficients of the prototype filter may be determined which result in a possibly maximum reduction of the objective function.

If the gradient determined in unit 306 remains within predetermined bounds, the decision unit 307 decides that a minimum of the objective function has been reached and terminates the optimization procedure in step 308. If on the other hand, the gradient exceeds the predetermined value, then the coefficients of the prototype filter are updated in the update unit 309. The update of the coefficients may be performed by modifying the coefficients with a predetermined step into the direction given by the gradient. Eventually, the updated coefficients of the prototype filter are reinserted as an input to the pass band error determination unit 303 for another iteration of the optimization procedure.

Overall, it can be stated that using the above error function and an appropriate optimization algorithm, prototype filters may be determined that are optimized with respect to their degree of perfect reconstruction, i.e. with respect to low aliasing in combination with low phase and/or amplitude distortion, their resilience to aliasing due to subband modifications, their system delay and/or their transfer function. The design method provides parameters, notably a weighting parameter α, a target delay D, a target transfer function P(ω), a filter length N, a number of filter bank channels M, as well as aliasing trigger parameters hiCut, loCut, which may be selected to obtain an optimal combination of the above mentioned filter properties. Furthermore, the setting to zero of a certain number of subband channels, as well as the partial complex processing may be used to reduce the overall complexity of the optimization procedure. As a result, asymmetric prototype filters with a near perfect reconstruction property, low sensitivity to aliasing and a low system delay may be determined for usage in a complex exponential modulated filter bank. It should be noted that the above determination scheme of a prototype filter has been outlined in the context of a complex exponential modulated filter bank. If other filter bank design methods are used, e.g. cosine modulated or sine modulated filter bank design methods, then the optimization procedure may be adapted by generating the analysis and synthesis filters h_(k)(n) and f_(k)(n) using the design equations of the respective filter bank design method. By way of example, Eqs. (13) to (15) may be used in the context of a cosine modulated filter bank.

In the following, a detailed example of a 64 channel low delay filter bank is described. Using the proposed aforementioned optimization method, a detailed example of an alias gain term optimized, low delay, 64-channel filter bank (M=64) will be outlined. In this example the partially complex optimization method has been used and the uppermost 40 channels have been set to zero during the prototype filter optimization, i.e. hiCut=40, whereas the loCut parameter remained unused. Hence, all alias gain terms, except Ã_(l), where l=24, 40, are calculated using real-valued filters. The total system delay is chosen as D=319, and the prototype filter length is N=640. A time domain plot of the resulting prototype filter is given in FIG. 4( a), and the frequency response of the prototype filter is depicted in FIG. 4( b). The filter bank offers a pass band (amplitude and phase) reconstruction error of −72 dB. The phase deviation from a linear phase is smaller than ±0.02°, and the aliasing suppression is 76 dB when no modifications are done to the subband samples. The actual filter coefficients are tabulated in Table 1. Note that the coefficients are scaled by a factor M=64 in respect to other equations in this document that are dependent on an absolute scaling of the prototype filter.

While the above description of the design of the filter bank is based on a standard filter bank notation, an example for operating the designed filter bank may operate in other filter bank descriptions or notations, e.g. filter bank implementations which allow a more efficient operation on a digital signal processor.

In an example, the steps for filtering a time domain signal using the optimized prototype filter may be described as follows:

-   -   In order to operate the filter bank in an efficient manner, the         prototype filter, i.e. p₀(n) from Table 1, is first arranged in         the poly-phase representation, where every other of the         poly-phase filter coefficients are negated and all coefficient         are time-flipped as

p′ ₀(639−128m−n)=(−1)^(m) p ₀(128m+n),0≦n<128,0≦m<5  (40)

-   -   The analysis stage begins with the poly-phase representation of         the filter being applied to the time domain signal x(n) to         produce a vector x_(l)(n) of length 128 as

$\begin{matrix} {{{x_{127 - l}(n)} = {\sum\limits_{m = 0}^{4}\; {{p_{0}^{\prime}\left( {{128\; m} + l} \right)} \times \left( {{128\; m} + l + {64\; n}} \right)}}},{0 \leq l < 128},{n = 0},1,\ldots} & (41) \end{matrix}$

-   -   x_(l)(n) is subsequently multiplied with a modulation matrix as

$\begin{matrix} {{{v_{k}(n)} = {\sum\limits_{l = 0}^{127}\; {{x_{l}(n)}{\exp \left( {j\frac{\pi}{128}\left( {k + \frac{1}{2}} \right)\left( {{2\; l} + 129} \right)} \right)}}}},{0 \leq k < 64},} & (42) \end{matrix}$

-   -    where ν_(k)(n), k=0 . . . 63, constitute the subband signals.         The time index n is consequently given in subband samples.     -   The complex-valued subband signals can then be modified, e.g.         according to some desired, possibly time-varying and         complex-valued, equalization curve g_(k)(n), as

ν_(k) ^((m))(n)=g _(k)(n)ν_(k)(n),0≦k<64.  (43)

-   -   The synthesis stage starts with a demodulation step of the         modified subband signals as

$\begin{matrix} {{{u_{l}(n)} = {\frac{1}{64}{\sum\limits_{k = 0}^{63}\; {{Re}\left\{ {{v_{k}^{(m)}(n)}{\exp \left( {j\frac{\pi}{128}\left( {k + \frac{1}{2}} \right)\left( {{2\; l} - 255} \right)} \right)}} \right\}}}}},{0 \leq l < 128.}} & (44) \end{matrix}$

It should be noted that the modulation steps of Eqs. (42) and (44) may be accomplished in a computationally very efficient manner with fast algorithms using fast Fourier transform (FFT) kernels.

-   -   The demodulated samples are filtered with the poly-phase         representation of the prototype filter and accumulated to the         output time domain signal {circumflex over (x)}(n) according to

{circumflex over (x)}(128m+l+64n)={circumflex over (x)}(128m+l+64n)+p′ ₀(639−128m−l)u _(l)(l),0≦l<128,0≦m<5,n=0,1, . . .   (45)

-   -    where {circumflex over (x)}(n) is set to 0 for all n at         start-up time.

It should be noted that both floating point and fixed point implementations might change the numerical accuracy of the coefficients given in Table 1 to something more suitable for processing. Without limiting the scope, the values may be quantized to a lower numerical accuracy by rounding, truncating and/or by scaling the coefficients to integer or other representations, in particular representations that are adapted to the available resources of a hardware and/or software platform on which the filter bank is to operate.

Moreover, the example above outlines the operation where the time domain output signal is of the same sampling frequency as the input signal. Other implementations may resample the time domain signal by using different sizes, i.e. different number of channels, of the analysis and synthesis filter banks, respectively. However, the filter banks should be based on the same prototype filter, and are obtained by resampling of the original prototype filter through either decimation or interpolation. As an example, a prototype filter for a 32 channel filter bank is achieved by resampling the coefficients p₀(n) as

${{p_{0}^{(32)}(i)} = {\frac{1}{2}\left\lbrack {{p_{0}\left( {{2i} + 1} \right)} + {p_{0}\left( {2i} \right)}} \right\rbrack}},{0 \leq i < 320.}$

The length of the new prototype filter is hence 320 and the delay is D=└319/2┘=159, where the operator └•┘ returns the integer part of its argument.

TABLE 1 Coefficients of a 64 channel low delay prototype filter n P₀(n) 0 −7.949261005955764e−4 1 −1.232074328145439e−3 2 −1.601053942982895e−3 3 −1.980720409470913e−3 4 −2.397504953865715e−3 5 −2.838709203607079e−3 6 −3.314755401090670e−3 7 −3.825180949035082e−3 8 −4.365307413613105e−3 9 −4.937260935539922e−3 10 −5.537381514710146e−3 11 −6.164241937824271e−3 12 −6.816579194002503e−3 13 −7.490102145765528e−3 14 −8.183711450708110e−3 15 −8.894930051379498e−3 16 −9.620004581607449e−3 17 −1.035696814015217e−2 18 −1.110238617202191e−2 19 −1.185358556146692e−2 20 −1.260769256679562e−2 21 −1.336080675156018e−2 22 −1.411033176541011e−2 23 −1.485316243134798e−2 24 −1.558550942227883e−2 25 −1.630436835497356e−2 26 −1.700613959422392e−2 27 −1.768770555992799e−2 28 −1.834568069395711e−2 29 −1.897612496482356e−2 30 −1.957605813345359e−2 31 −2.014213322475170e−2 32 −2.067061748933033e−2 33 −2.115814831921453e−2 34 −2.160130854695980e−2 35 −2.199696217022438e−2 36 −2.234169110698344e−2 37 −2.263170795250229e−2 38 −2.286416556008894e−2 39 −2.303589449043864e−2 40 −2.314344724218223e−2 41 −2.318352524475873e−2 42 −2.315297727620401e−2 43 −2.304918234544422e−2 44 −2.286864521420490e−2 45 −2.260790764376614e−2 46 −2.226444264459477e−2 47 −2.183518667784246e−2 48 −2.131692017682024e−2 49 −2.070614962636994e−2 50 −1.999981321635736e−2 51 −1.919566223498554e−2 52 −1.828936158524688e−2 53 −1.727711874492186e−2 54 −1.615648494779686e−2 55 −1.492335807272955e−2 56 −1.357419760297910e−2 57 −1.210370330110896e−2 58 −1.050755164953818e−2 59 −8.785746151726750e−3 60 −6.927329556345040e−3 61 −4.929378450735877e−3 62 −2.800333941149626e−3 63 −4.685580749545335e−4 64 2.210315255690887e−3 65 5.183294908090526e−3 66 8.350964449424035e−3 67 1.166118535611788e−2 68 1.513166797475777e−2 69 1.877264877027943e−2 70 2.258899222368603e−2 71 2.659061474958830e−2 72 3.078087745385930e−2 73 3.516391224752870e−2 74 3.974674893613862e−2 75 4.453308211110493e−2 76 4.952626097917320e−2 77 5.473026727738295e−2 78 6.014835645056577e−2 79 6.578414516120631e−2 80 7.163950999489413e−2 81 7.771656494569829e−2 82 8.401794441130064e−2 83 9.054515924487507e−2 84 9.729889691289549e−2 85 1.042804039148369e−1 86 1.114900795290448e−1 87 1.189284254931251e−1 88 1.265947532678997e−1 89 1.344885599112251e−1 90 1.426090972422485e−1 91 1.509550307914161e−1 92 1.595243494708706e−1 93 1.683151598707939e−1 94 1.773250461581686e−1 95 1.865511418631904e−1 96 1.959902227114119e−1 97 2.056386275763479e−1 98 2.154925974105375e−1 99 2.255475564993390e−1 100 2.357989864681126e−1 101 2.462418809459464e−1 102 2.568709554604541e−1 103 2.676805358910440e−1 104 2.786645734207760e−1 105 2.898168394038287e−1 106 3.011307516871287e−1 107 3.125994749246541e−1 108 3.242157192666507e−1 109 3.359722796803192e−1 110 3.478614117031655e−1 111 3.598752336287570e−1 112 3.720056632072922e−1 113 3.842444358173011e−1 114 3.965831241942321e−1 115 4.090129566893579e−1 116 4.215250930838456e−1 117 4.341108982328533e−1 118 4.467608231633283e−1 119 4.594659376709624e−1 120 4.722166595058233e−1 121 4.850038204075748e−1 122 4.978178235802594e−1 123 5.106483456192374e−1 124 5.234865375971977e−1 125 5.363218470709771e−1 126 5.491440356706657e−1 127 5.619439923555571e−1 128 5.746001351404267e−1 129 5.872559277139351e−1 130 5.998618924353250e−1 131 6.123980151490041e−1 132 6.248504862282382e−1 133 6.372102969387355e−1 134 6.494654463921502e−1 135 6.616044277534099e−1 136 6.736174463977084e−1 137 6.854929931488056e−1 138 6.972201618598393e−1 139 7.087881675504216e−1 140 7.201859881692665e−1 141 7.314035334082558e−1 142 7.424295078874311e−1 143 7.532534422335129e−1 144 7.638649113306198e−1 145 7.742538112450130e−1 146 7.844095212375462e−1 147 7.943222347831999e−1 148 8.039818519286321e−1 149 8.133789939828571e−1 150 8.225037151897938e−1 151 8.313468549324594e−1 152 8.398991600556686e−1 153 8.481519810689574e−1 154 8.560963550316389e−1 155 8.637239863984174e−1 156 8.710266607496513e−1 157 8.779965198108476e−1 158 8.846258145496611e−1 159 8.909071890560218e−1 160 8.968337036455653e−1 161 9.023985431182168e−1 162 9.075955881221292e−1 163 9.124187296760565e−1 164 9.168621399784253e−1 165 9.209204531389191e−1 166 9.245886139655739e−1 167 9.278619263447355e−1 168 9.307362242659798e−1 169 9.332075222986479e−1 170 9.352724511271509e−1 171 9.369278287932853e−1 172 9.381709878904797e−1 173 9.389996917291260e−1 174 9.394121230559878e−1 175 9.394068064126931e−1 176 9.389829174860432e−1 177 9.381397976778112e−1 178 9.368773370086998e−1 179 9.351961242404785e−1 180 9.330966718935136e−1 181 9.305803205049067e−1 182 9.276488080866625e−1 183 9.243040558859498e−1 184 9.205488097488350e−1 185 9.163856478189402e−1 186 9.118180055332041e−1 187 9.068503557855540e−1 188 9.014858673099563e−1 189 8.957295448806664e−1 190 8.895882558527375e−1 191 8.830582442418677e−1 192 8.761259906419252e−1 193 8.688044201931157e−1 194 8.611140376567749e−1 195 8.530684188588082e−1 196 8.446723286380624e−1 197 8.359322523144003e−1 198 8.268555005748937e−1 199 8.174491260941859e−1 200 8.077214932837783e−1 201 7.976809997929416e−1 202 7.873360271773119e−1 203 7.766956604639097e−1 204 7.657692341138960e−1 205 7.545663748526984e−1 206 7.430967641354331e−1 207 7.313705248813991e−1 208 7.193979757178656e−1 209 7.071895814695481e−1 210 6.947561322714310e−1 211 6.821083135331770e−1 212 6.692573319585476e−1 213 6.562143182387809e−1 214 6.429904538706975e−1 215 6.295973685335782e−1 216 6.160464554756299e−1 217 6.023493418727370e−1 218 5.885176369189331e−1 219 5.745630487304467e−1 220 5.604973280717471e−1 221 5.463322649085826e−1 222 5.320795532569365e−1 223 5.177509557831821e−1 224 5.033582842235876e−1 225 4.889131973708936e−1 226 4.744274511088447e−1 227 4.599125196114154e−1 228 4.453800290341801e−1 229 4.308413090599260e−1 230 4.163077444128621e−1 231 4.017905891818764e−1 232 3.873008819361793e−1 233 3.728496914938361e−1 234 3.584479879275654e−1 235 3.441060828393923e−1 236 3.298346836739700e−1 237 3.156442070098094e−1 238 3.015447421741344e−1 239 2.875462383794429e−1 240 2.736584401802921e−1 241 2.598909819775319e−1 242 2.462531686198759e−1 243 2.327540108460799e−1 244 2.194025590645563e−1 245 2.062071988727463e−1 246 1.931765200055820e−1 247 1.803186073942884e−1 248 1.676410590306998e−1 249 1.551517472268748e−1 250 1.428578337203540e−1 251 1.307662172525294e−1 252 1.188837988250476e−1 253 1.072167300568495e−1 254 9.577112136322552e−2 255 8.455282024161610e−2 256 7.355793885744523e−2 257 6.280513608528435e−2 258 5.229589453075828e−2 259 4.203381031272017e−2 260 3.202301123728688e−2 261 2.226720136600903e−2 262 1.277000586069404e−2 263 3.534672952747162e−3 264 −5.435672410526313e−3 265 −1.413857081863553e−2 266 −2.257147752062613e−2 267 −3.073254829666290e−2 268 −3.861994968092324e−2 269 −4.623245158508806e−2 270 −5.356875686113461e−2 271 −6.062844791918062e−2 272 −6.741087925238425e−2 273 −7.391592258255635e−2 274 −8.014393008412193e−2 275 −8.609517876186421e−2 276 −9.177059647159572e−2 277 −9.717118785672957e−2 278 −1.022983899423088e−1 279 −1.071535873159799e−1 280 −1.117390940373963e−1 281 −1.160565563647874e−1 282 −1.201089957775325e−1 283 −1.238986104503973e−1 284 −1.274286534385776e−1 285 −1.307022037585206e−1 286 −1.337226598624689e−1 287 −1.364936502000925e−1 288 −1.390190836588895e−1 289 −1.413030335001078e−1 290 −1.433497698594264e−1 291 −1.451636222445455e−1 292 −1.467494079461177e−1 293 −1.481116975400198e−1 294 −1.492556249421260e−1 295 −1.501862836334994e−1 296 −1.509089024309573e−1 297 −1.514289033634045e−1 298 −1.517517580141857e−1 299 −1.518832057448775e−1 300 −1.518289202172233e−1 301 −1.515947694390820e−1 302 −1.511866738705995e−1 303 −1.506105955209982e−1 304 −1.498725980913964e−1 305 −1.489787144055076e−1 306 −1.479352185844335e−1 307 −1.467481851768966e−1 308 −1.454239120021382e−1 309 −1.439685961257477e−1 310 −1.423884130127772e−1 311 −1.406896926563808e−1 312 −1.388785953623746e−1 313 −1.369612022106282e−1 314 −1.349437727408798e−1 315 −1.328323917411932e−1 316 −1.306331212230066e−1 317 −1.283520431992394e−1 318 −1.259952253813674e−1 319 −1.235680807908494e−1 320 −1.210755701624524e−1 321 −1.185237142283346e−1 322 −1.159184450952715e−1 323 −1.132654367461266e−1 324 −1.105698782276963e−1 325 −1.078369135648348e−1 326 −1.050716118804287e−1 327 −1.022789198651472e−1 328 −9.946367410320074e−2 329 −9.663069107327295e−2 330 −9.378454802679648e−2 331 −9.092970207094843e−2 332 −8.807051083640835e−2 333 −8.521107266503664e−2 334 −8.235562752947133e−2 335 −7.950789957683559e−2 336 −7.667177989755110e−2 337 −7.385092587441364e−2 338 −7.104866702770536e−2 339 −6.826847016140082e−2 340 −6.551341011471171e−2 341 −6.278658929544248e−2 342 −6.009091369370080e−2 343 −5.742919825387360e−2 344 −5.480383115198150e−2 345 −5.221738078737957e−2 346 −4.967213638808988e−2 347 −4.717023345307148e−2 348 −4.471364025371278e−2 349 −4.230438144160113e−2 350 −3.994384828552555e−2 351 −3.763371362431132e−2 352 −3.537544041600725e−2 353 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−1.096860208856302e−5 627 9.881411051921578e−6 628 2.951496818998434e−5 629 4.810106298036608e−5 630 6.513783951460106e−5 631 8.051456871678129e−5 632 9.429776656872437e−5 633 1.058298511976110e−4 634 1.155823148740170e−4 635 1.229659417867084e−4 636 1.266886375085138e−4 637 1.279376783418106e−4 638 1.216914974923773e−4 639 9.386301157644215e−5

In the following, different aspects of practical implementations are outlined. Using a standard PC or DSP, real-time operation of a low delay complex-exponential modulated filter bank is possible. The filter bank may also be hard-coded on a custom chip. FIG. 5( a) shows the structure for an effective implementation of the analysis part of a complex-exponential modulated filter bank system. The analogue input signal is first fed to an A/D converter 501. The digital time domain signal is fed to a shift register holding 2M samples shifting M samples at a time 502. The signals from the shift register are then filtered through the poly-phase coefficients of the prototype filter 503. The filtered signals are subsequently combined 504 and in parallel transformed with a DCT-IV 505 and a DST-IV 506 transform. The outputs from the cosine and sine transforms constitute the real and the imaginary parts of the subband samples respectively. The gains of the subband samples are modified according to the current spectral envelope adjuster setting 507.

An effective implementation of the synthesis part of a low delay complex-exponential modulated system is shown in FIG. 5( b). The subband samples are first multiplied with complex-valued twiddle-factors, i.e. complex-valued channel dependent constants, 511, and the real part is modulated with a DCT-IV 512 and the imaginary part with a DST-IV 513 transform. The outputs from the transforms are combined 514 and fed through the poly-phase components of the prototype filter 515. The time domain output signal is obtained from the shift register 516. Finally, the digital output signal is converted back to an analogue waveform 517.

While the above outlined implementations use DCT and DST type IV transforms, implementations using DCT type II and III kernels are equally possible (and also DST type II and III based implementations). However, the most computationally efficient implementations for complex-exponential modulated banks use pure FFT kernels. Implementations using a direct matrix-vector multiplication are also possible but are inferior in efficiency.

In summary, the present document describes a design method for prototype filters used in analysis/synthesis filter banks. Desired properties of the prototype filters and the resulting analysis/synthesis filter banks are near perfect reconstruction, low delay, low sensitivity to aliasing and minimal amplitude/phase distortion. An error function is proposed which may be used in an optimization algorithm to determine appropriate coefficients of the prototype filters. The error function comprises a set of parameters that may be tuned to modify the emphasis between the desired filter properties. Preferably, asymmetric prototype filters are used. Furthermore, a prototype filter is described which provides a good compromise of desired filter properties, i.e. near perfect reconstruction, low delay, high resilience to aliasing and minimal phase/amplitude distortion.

While specific embodiments and applications have been described herein, it will be apparent to those of ordinary skill in the art that many variations on the embodiments and applications described herein are possible without departing from the scope of the invention described and claimed herein. It should be understood that while certain forms of the invention have been shown and described, the invention is not to be limited to the specific embodiments described and shown or the specific methods described.

The filter design method and system as well as the filter bank described in the present document may be implemented as software, firmware and/or hardware. Certain components may e.g. be implemented as software running on a digital signal processor or microprocessor. Other component may e.g. be implemented as hardware and or as application specific integrated circuits. The signals encountered in the described methods and systems may be stored on media such as random access memory or optical storage media. They may be transferred via networks, such as radio networks, satellite networks, wireless networks or wireline networks, e.g. the Internet. Typical devices making use of the filter banks described in the present document are set-top boxes or other customer premises equipment which decode audio signals. On the encoding side, the filter banks may be used in broadcasting stations, e.g. in video headend systems. 

1. A method (300) for determining N coefficients of an asymmetric prototype filter p₀ for usage for building an M-channel, low delay decimated analysis/synthesis filter bank (101, 102) comprising M analysis filters h_(k) (103) and M synthesis filters f_(k) (106), k=0, . . . , M−1, wherein M is greater than 1, and having a transfer function, the method comprising the steps of choosing (301) a target transfer function of the filter bank comprising a target delay D; wherein D is smaller or equal to N; determining (303, 304, 305) a composite objective function e_(tot) comprising a pass band error term e_(t) and an aliasing error term e_(a); wherein the pass band error term e_(t) is associated with the deviation between the transfer function of the filter bank and the target transfer function; and wherein the aliasing error term e_(a) is associated with errors incurred due to the subsampling of the filter bank; and determining (306, 309) N coefficients of the asymmetric prototype filter p₀ that reduce the composite objective function e_(tot).
 2. The method (300) of claim 1, wherein the composite objective function e_(tot) is given by: e _(tot)(α)=αe _(t)+(1−α)e _(a), with α being a weighting constant taking on values between 0 and
 1. 3. The method (300) of claim 2, wherein the pass band error term e_(t) is determined (303) by accumulating the squared deviation between the transfer function of the filter bank and the target transfer function for a plurality of frequencies.
 4. The method (300) of claim 3, wherein the pass band error term e_(t) is calculated (303) as ${e_{t} = \left. {\frac{1}{2\pi}\int_{- \pi}^{\pi}} \middle| {{\frac{1}{2}\left( {{A_{o}\left( ^{j\; \omega} \right)} + {A_{0}^{*}\left( ^{{- j}\; \omega} \right)}} \right)} - {{P(\omega)}^{{- j}\; \omega \; D}}} \middle| {}_{2}{\omega} \right.},$ with P(ω)e^(−jωD) being the target transfer function, and ${{A_{0}(z)} = {\sum\limits_{k = 0}^{M - 1}\; {{H_{k}(z)}{F_{k}(z)}}}},$ wherein H_(k)(z) and F_(k)(z) are the z-transforms of the analysis and synthesis filters h_(k)(n) and f_(k)(n), respectively.
 5. The method (300) of claim 3, wherein the aliasing error term e_(a) is determined (304, 305) by accumulating the squared magnitude of alias gain terms for a plurality of frequencies.
 6. The method (300) of claim 5, wherein the aliasing error term e_(a) is calculated (304, 305) as ${e_{a} = {\frac{1}{2\pi}{\sum\limits_{l = 1}^{M - 1}\; {\int_{- \pi}^{\pi}{{{{\overset{\sim}{A}}_{l}\left( ^{j\; \omega} \right)}}^{2}{\omega}}}}}},$ with Ã_(l)(z)=A_(l)(z)+A_(M-l)*(z), l=1 . . . M−1, and z=e^(jω) and with ${A_{l}(z)} = {\sum\limits_{k = 0}^{M - 1}\; {{H_{k}\left( {zW}^{l} \right)}{F_{k}(z)}}}$ being the l^(th) alias gain term evaluated on the unit circle with W=e^(−i2π/M), wherein H_(k)(z) and F_(k)(z) are the z-transforms of the analysis and synthesis filters h_(k)(n) and f_(k)(n), respectively.
 7. The method (300) of any previous claim, wherein the step of determining (303, 304, 305) the composite objective function e_(tot) and the step of determining (306, 309) the N coefficients of the asymmetric prototype filter p₀ are repeated iteratively, until a minimum of the composite objective function e_(tot) is reached.
 8. The method (300) of claim 7, wherein the step of determining (303, 304, 305) the composite objective function e_(tot) comprises determining a value for the composite objective function e_(tot) for given coefficients of the prototype filter p₀; and the step of determining (306, 309) the N coefficients of the asymmetric prototype filter p₀ comprises determining (309) updated coefficients of the prototype filter p₀ based on the gradient of the composite objective function e_(tot) with respect to the coefficients of the prototype filter p₀.
 9. The method (300) of any previous claim, wherein the step of determining (303, 304, 305) a value for the composite objective function e_(tot) comprises: generating the analysis filters h_(k) and the synthesis filters f_(k) of the analysis/synthesis filter bank based on the prototype filter p₀ using cosine modulation, sine modulation and/or complex-exponential modulation.
 10. The method (300) of any previous claim, wherein the analysis and synthesis filters are determined as ${{h_{k}(n)} = {\sqrt{2}{p_{0}(n)}\cos \left\{ {\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - {\frac{D}{2} \mp \frac{M}{2}}} \right)} \right\}}},$ with n=0 . . . N−1, for the M analysis filters of the analysis filter bank and; ${{f_{k}(n)} = {\sqrt{2}{p_{0}(n)}\cos \left\{ {\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - {\frac{D}{2\pi} \pm \frac{M}{2}}} \right)} \right\}}},$ with n=0 . . . N−1, for the M synthesis filters of the synthesis filter bank.
 11. The method (300) of any previous claim, wherein the analysis and synthesis filters are determined as ${{h_{k}(n)} = {{p_{0}(n)}{\exp\left( {i\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - \frac{D}{2} - A} \right)} \right\}}}},$ with n=0 . . . N−1, and A being an arbitrary constant, for the M analysis filters of the analysis filter bank and; ${{f_{k}(n)} = {{p_{0}(n)}\exp \left\{ {i\frac{\pi}{M}\left( {k + \frac{1}{2}} \right)\left( {n - \frac{D}{2} + A} \right)} \right\}}},$ with n=0 . . . N−1, for the M synthesis filters of the synthesis filter bank.
 12. The method (300) of any previous claim, wherein the step of determining (303, 304, 305) a value for the composite objective function e_(tot) comprises: setting at least one of the filter bank channels to zero.
 13. The method (300) of claim 12, wherein the low frequency filter bank channels k=0 up to C_(low); with C_(low), with greater than zero and/or the high frequency filter bank channels k=C_(high) up to M−1, with C_(high) smaller than M−1, are set to zero.
 14. The method (300) of claim 13, wherein the step of determining (303, 304, 305) a value for the composite objective function e_(tot) comprises: generating the analysis and synthesis filters for the channels C_(low), and M−C_(low) and/or C_(high) and M−C_(high) using claim 11; and generating the analysis and synthesis filters for the remaining channels using claim
 10. 15. The method (300) of any previous claim, wherein the analysis filter bank generates M subband signals from an input signal using the M analysis filters h_(k) (103); the M subband signals are decimated (104) by a factor M, yielding decimated subband signals; the decimated subband signals are upsampled (105) by a factor M; and the synthesis filter bank generates an output signal from the upsampled decimated subband signals using the M synthesis filters f_(k) (106).
 16. The method (300) of any previous claims, wherein M=64; N=640; and D=319.
 17. An asymmetric prototype filter p₀(n) comprising coefficients derivable from the coefficients of Table 1 by any of the operations of rounding, truncating, scaling, subsampling or oversampling.
 18. A filter bank comprising M filters based on the asymmetric prototype filter according to claim 17 and/or based on an asymmetric prototype filter generated by the method of any of claims 1 to
 16. 19. The filter bank according to claim 18, wherein the M filters are modulated versions of the prototype filter; and the modulation is a cosine modulation, sine modulation and/or complex-exponential modulation.
 20. A method for generating decimated subband signals with low sensitivity to aliasing emerging from modifications of said subband signals, the method comprising the steps of: determining analysis filters of an analysis/synthesis filter bank according to claim 18 or 19; filtering a real-valued time domain signal through said analysis filters, to obtain complex-valued subband signals; and decimating said subband signals.
 21. A method for generating a real valued output signal from a plurality of complex-valued subband signals with low sensitivity to aliasing emerging from modifications of said subband signals, the method comprising the steps of: determining synthesis filters of an analysis/synthesis filter bank according to claim 18 or 19; interpolating said plurality of complex-valued subband signals; filtering said plurality of interpolated subband signals through said synthesis filters; generating a complex-valued time domain output signal as the sum of the signals obtained from said filtering; and taking the real part of the complex-valued time domain output signal as the real valued output signal.
 22. A system operative of generating subband signals from a time domain input signal, wherein the system comprises an analysis filter bank according to claim 18 or
 19. 23. An apparatus operable to determining N coefficients of an asymmetric prototype filter p₀ for usage for building an M-channel, low delay decimated analysis/synthesis filter bank (101, 102) comprising M analysis filters h_(k) (103) and M synthesis filters f_(k) (106), k=0, . . . , M−1, wherein M is greater than 1, and having a transfer function, the apparatus comprising a parameter setting unit (301) operable to setting a target transfer function of the filter bank comprising a target delay D; wherein D is smaller or equal to N; an error determination unit (303, 304, 305) operable to determining a composite objective function e_(tot) comprising a pass band error term e_(t) and an aliasing error term e_(a); wherein the pass band error term e_(t) is associated with the deviation between the transfer function of the filter bank and the target transfer function; and wherein the aliasing error term e_(a) is associated with errors incurred due to the subsampling of the filter bank; and an optimization unit (306, 309) operable to determining N coefficients of the asymmetric prototype filter p₀ that reduce the composite objective function e_(tot). 